The entry sum of the inverse Cauchy matrix

Abstract

Let x1,x2,…,xn be n numbers, and y1,y2,…,yn be n further numbers chosen such that all n2 pairwise sums xi+yj are nonzero. Consider the n× n-matrix \[ C:=( 1xi+yj) 1≤ i≤ n,\ 1≤ j≤ n = pmatrix 1x1+y1 & 1x1+y2 & ·s & 1x1+yn\\ 1x2+y1 & 1x2+y2 & ·s & 1x2+yn\\ & & & \\ 1xn+y1 & 1xn+y2 & ·s & 1xn+yn pmatrix. \] This matrix C is known as the "Cauchy matrix", and has been studied for 180 years. A classical result says that if C is invertible, then the sum of all entries of its inverse C-1 is Σk=1nxk+Σk=1nyk. We give a simple and short proof of this result, and briefly discuss a "tropicalized" variant in which the entries 1xi+yj are replaced by \ xi,yj\.